Riesz transforms, Hardy spaces and Campanato spaces associated with Laguerre expansions

Abstract

Let ∈ [-1/2,∞)n, n 1, and let L be a self-adjoint extension of the differential operator \[ L := Σi=1n [-∂2∂ xi2 + xi2 + 1xi2(i2 - 14)] \] on Cc∞(R+n) as the natural domain. In this paper, we first prove that the Riesz transform associated with L is a Calder\'on-Zygmund operator, answering the open problem in [JFA, 244 (2007), 399-443]. In addition, we develop the theory of Hardy spaces and Campanato spaces associated with L. As applications, we prove that the Riesz transform related to L is bounded on these Hardy spaces and Campanato spaces, completing the description of the boundedness of the Riesz transform in the Laguerre expansion setting.

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